An hyperbolic-parabolic predator-prey model involving a vole population structured in age
DOI10.1016/J.JMAA.2021.125232zbMath1470.35359OpenAlexW3155016561WikidataQ115570210 ScholiaQ115570210MaRDI QIDQ2033173
T. N. T. Nguyen, Carlotta Donadello, Giuseppe Maria Coclite
Publication date: 14 June 2021
Published in: Journal of Mathematical Analysis and Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jmaa.2021.125232
population dynamicsparabolic-hyperbolic equationsnonlocal boundary value problempredator-prey systemsnonlocal conservation laws
Stability in context of PDEs (35B35) PDEs in connection with biology, chemistry and other natural sciences (35Q92) Population dynamics (general) (92D25)
Related Items (1)
Cites Work
- Existence and strong pre-compactness properties for entropy solutions of a first-order quasilinear equation with discontinuous flux
- The embedding of the positive cone of $H^{-1}$ in $W^{-1,\,q}$ is compact for all $q<2$ (with a remark of Haim Brezis)
- Mathematical biology. Vol. 1: An introduction.
- A PDE model for the spatial dynamics of a voles population structured in age
- Hyperbolic predators vs. parabolic prey
- Stability and optimization in structured population models on graphs
This page was built for publication: An hyperbolic-parabolic predator-prey model involving a vole population structured in age
